Multiple Premise Inference | Worksheet 1 - Absolute-Beginner Level ...

Question 1

Consider these premises: • No reptiles are warm-blooded • All snakes are reptiles • Python is a snake Which conclusion logically follows?

By combining the premises logically:
• No reptiles are warm-blooded
• All snakes are reptiles
• Python is a snake

We can deduce: Python is not warm-blooded

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 2

Consider these premises: • All programmers write code • Some code contains bugs • Alice is a programmer Which conclusion logically follows?

By combining the premises logically:
• All programmers write code
• Some code contains bugs
• Alice is a programmer

We can deduce: Alice writes code

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 3

Consider these premises: • All mammals are warm-blooded • All whales are mammals • Moby is a whale Which conclusion logically follows?

By combining the premises logically:
• All mammals are warm-blooded
• All whales are mammals
• Moby is a whale

We can deduce: Moby is warm-blooded

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 4

Consider these premises: • No criminals are honest • Some politicians are criminals • Robert is a politician Which conclusion logically follows?

By combining the premises logically:
• No criminals are honest
• Some politicians are criminals
• Robert is a politician

We can deduce: Robert may not be honest

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 5

Consider these premises: • All roses are beautiful • Some beautiful things are expensive • This is a rose Which conclusion logically follows?

By combining the premises logically:
• All roses are beautiful
• Some beautiful things are expensive
• This is a rose

We can deduce: This is beautiful

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 6

Consider these premises: • All squares are rectangles • No rectangles are circles • This shape is a square Which conclusion logically follows?

By combining the premises logically:
• All squares are rectangles
• No rectangles are circles
• This shape is a square

We can deduce: This shape is not a circle

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 7

Consider these premises: • All programmers write code • Some code contains bugs • Alice is a programmer Which conclusion logically follows?

By combining the premises logically:
• All programmers write code
• Some code contains bugs
• Alice is a programmer

We can deduce: Alice writes code

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 8

Consider these premises: • All squares are rectangles • No rectangles are circles • This shape is a square Which conclusion logically follows?

By combining the premises logically:
• All squares are rectangles
• No rectangles are circles
• This shape is a square

We can deduce: This shape is not a circle

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 9

Consider these premises: • No reptiles are warm-blooded • All snakes are reptiles • Python is a snake Which conclusion logically follows?

By combining the premises logically:
• No reptiles are warm-blooded
• All snakes are reptiles
• Python is a snake

We can deduce: Python is not warm-blooded

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 10

Consider these premises: • If you save money, you become wealthy • If you become wealthy, you can travel • Emma saves money Which conclusion logically follows?

By combining the premises logically:
• If you save money, you become wealthy
• If you become wealthy, you can travel
• Emma saves money

We can deduce: Emma can travel

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 11

Consider these premises: • If you practice daily, you improve • If you improve, you win matches • Sarah practices daily Which conclusion logically follows?

By combining the premises logically:
• If you practice daily, you improve
• If you improve, you win matches
• Sarah practices daily

We can deduce: Sarah will win matches

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 12

Consider these premises: • All programmers write code • Some code contains bugs • Alice is a programmer Which conclusion logically follows?

By combining the premises logically:
• All programmers write code
• Some code contains bugs
• Alice is a programmer

We can deduce: Alice writes code

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 13

Consider these premises: • All doctors are educated • Some educated people are rich • Dr. Smith is a doctor Which conclusion logically follows?

By combining the premises logically:
• All doctors are educated
• Some educated people are rich
• Dr. Smith is a doctor

We can deduce: Dr. Smith is educated

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 14

Consider these premises: • If you practice daily, you improve • If you improve, you win matches • Sarah practices daily Which conclusion logically follows?

By combining the premises logically:
• If you practice daily, you improve
• If you improve, you win matches
• Sarah practices daily

We can deduce: Sarah will win matches

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 15

Consider these premises: • All squares are rectangles • No rectangles are circles • This shape is a square Which conclusion logically follows?

By combining the premises logically:
• All squares are rectangles
• No rectangles are circles
• This shape is a square

We can deduce: This shape is not a circle

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 16

Consider these premises: • All philosophers are thinkers • Some thinkers are logicians • Socrates is a philosopher Which conclusion logically follows?

By combining the premises logically:
• All philosophers are thinkers
• Some thinkers are logicians
• Socrates is a philosopher

We can deduce: Socrates is a thinker

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 17

Consider these premises: • All philosophers are thinkers • Some thinkers are logicians • Socrates is a philosopher Which conclusion logically follows?

By combining the premises logically:
• All philosophers are thinkers
• Some thinkers are logicians
• Socrates is a philosopher

We can deduce: Socrates is a thinker

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 18

Consider these premises: • If you practice daily, you improve • If you improve, you win matches • Sarah practices daily Which conclusion logically follows?

By combining the premises logically:
• If you practice daily, you improve
• If you improve, you win matches
• Sarah practices daily

We can deduce: Sarah will win matches

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 19

Consider these premises: • If you practice daily, you improve • If you improve, you win matches • Sarah practices daily Which conclusion logically follows?

By combining the premises logically:
• If you practice daily, you improve
• If you improve, you win matches
• Sarah practices daily

We can deduce: Sarah will win matches

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Question 20

Consider these premises: • All programmers write code • Some code contains bugs • Alice is a programmer Which conclusion logically follows?

By combining the premises logically:
• All programmers write code
• Some code contains bugs
• Alice is a programmer

We can deduce: Alice writes code

This uses 3-step logical reasoning, applying transitive properties and categorical logic.

Multiple Premise Inference - Absolute-Beginner Level: core concept mastery Multiple Premise Inference ABSOLUTE BEGINNER

What you'll learn in this worksheet:

Question 1

Question 2

Question 3

Question 4

Question 5

Question 6

Question 7

Question 8

Question 9

Question 10

Question 11

Question 12

Question 13

Question 14

Question 15

Question 16

Question 17

Question 18

Question 19

Question 20